# Why does InverseFunction[0 &]@0 return 33/10?

In Mathematica 8.0.1.0 on 32-bit Linux, the expression

``````InverseFunction[0 &]@0
``````

returns `33/10`. (The same occurs for other integer and rational values; I'm using `0` as an example.)

According to the documentation for `InverseFunction`:

As discussed in Functions That Do Not Have Unique Values, many mathematical functions do not have unique inverses. In such cases, InverseFunction[f] can represent only one of the possible inverses for f.

As a constant function `0&` will return `0` regardless of its input, it has infinitely many inverse functions (each of which is defined only at 0). So as defined, this answer is within the specification.

The mystery is, why does it give `33/10` rather than any other value?

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7.0 refuses to evaluate this, btw. –  kennytm Oct 12 '11 at 5:27
Try `Trace[InverseFunction[6 &]@6, TraceInternal -> True]` And search for 33/10 near the end –  belisarius Oct 12 '11 at 6:01
@belisarius: When seeding with `SeedRandom[0]`, `RandomSample[Range[-50,50],1]` produces `{33}` so I'm guessing that's where it comes from. –  Heike Oct 12 '11 at 8:16
When you trace the execution with the option `TraceInternal->True`, you see, among the huge output, code like `System`InstanceDump`freepts[{System`TRootsDump`X\$2453}, System`InstanceDump`dds\$2454, 1] `. If you further trace the `Trace[System`InstanceDump`freepts[{x}, {{x -> Reals}}, 1]]`, you see `System`InstanceDump`RandomSampleI[ Range[-(System`InstanceDump`\$intsize/2), System`InstanceDump`\$intsize/ 2], 1]/Sqrt[System`InstanceDump`\$intsize]`. The `intsize` variable is actually set to `100`, which, combined with observations of belisarius and Heike, leads to the puzzling output. –  Leonid Shifrin Oct 12 '11 at 10:32
@belisarius: Surprisingly enough, `SeedRandom[0]; RandomChoice[Range[n]]` gives `42` for any `n` in the range `[42, 64]`. Coincidence? I think not. –  Heike Oct 13 '11 at 17:56

That number appears in a number of instances. Take for instance:

FindInstance[x == x, x, Reals]

{{x->33/10}}

I've seen discussions of this number come up before. It's basically just some result of how Mathematica is implemented. You'll get this sometimes when you ask Mathematica to do something that boils down to "Pick a Random Real number". It doesn't have any real special meaning.

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